Rosser's theorem explained

In number theory, Rosser's theorem states that the

th prime number is greater than , where is the natural logarithm function. It was published by J. Barkley Rosser in 1939.^[1]

Its full statement is:

Let

be the th prime number. Then for

In 1999, Pierre Dusart proved a tighter lower bound:^[2]

See also

• Prime number theorem

References

1. Rosser, J. B. "The

   n

   -th Prime is Greater than

   nlogn

   ". Proceedings of the London Mathematical Society 45:21-44, 1939.
2. Pierre Dusart. Dusart. Pierre. The

   k

   th prime is greater than

   k(logk+loglogk-1)

   for

   k\geq2

   . Mathematics of Computation. 68. 225. 1999. 411–415. 1620223. 10.1090/S0025-5718-99-01037-6. free.

External links

• Rosser's theorem article on Wolfram Mathworld.